In this paper, we propose a high order residual distribution conservative finite difference scheme for solving steady state conservation laws. A new type of WENO (weighted essentially non-oscillatory) termed as WENO-ZQ integration is used to compute the numerical fluxes and source term based on the point values of the solution, and the principles of residual distribution schemes are adapted to obtain steady state solutions. Extensive numerical examples in both scalar and system test problems in one and two dimensions demonstrate the efficiency, high order accuracy and the capability of resolving shocks of the proposed methods
Abstract(#br)In this paper, we propose a hybrid finite volume Hermite weighted essentially non-oscil...
We show how to combine in a natural way (i.e., without any test nor switch) the conservative and non...
Essentially nonoscillatory (ENO) and weighted ENO (WENO) methods on equidistant Cartesian grids are ...
In this paper, we propose a high order residual distribution conservative finite difference scheme f...
In this paper, we develop a high order residual distribution (RD) method for solving steady state co...
Since a few years, the Residual Distribution (RD) methodology has become a more mature numerical tec...
In ([10], JCP 227 No. 6, 2008, pp. 3101–3211), the authors have designed a new fifth order WENO fini...
The ultimate goal of this article is to develop a robust and accurate numerical method for solving h...
We describe and review (non oscillatory) residual distribution schemes that are rather natural exten...
In this paper, we generalize the high order well-balanced finite difference weighted essentially non...
We are interested in the discretisation of the steady version of hyperbolic problems. We first show ...
In [8], the authors have designed a new fifth-order WENO finite-difference scheme (named WENO-eta) b...
In this paper, we first construct fourth and eighth order central WENO (weighted essen-tially non-os...
In Shen et al. (2020), the authors have proposed a novel weighting method to construct the fifth-ord...
We present a family of high-order, essentially non-oscillatory, central schemes for approximating ...
Abstract(#br)In this paper, we propose a hybrid finite volume Hermite weighted essentially non-oscil...
We show how to combine in a natural way (i.e., without any test nor switch) the conservative and non...
Essentially nonoscillatory (ENO) and weighted ENO (WENO) methods on equidistant Cartesian grids are ...
In this paper, we propose a high order residual distribution conservative finite difference scheme f...
In this paper, we develop a high order residual distribution (RD) method for solving steady state co...
Since a few years, the Residual Distribution (RD) methodology has become a more mature numerical tec...
In ([10], JCP 227 No. 6, 2008, pp. 3101–3211), the authors have designed a new fifth order WENO fini...
The ultimate goal of this article is to develop a robust and accurate numerical method for solving h...
We describe and review (non oscillatory) residual distribution schemes that are rather natural exten...
In this paper, we generalize the high order well-balanced finite difference weighted essentially non...
We are interested in the discretisation of the steady version of hyperbolic problems. We first show ...
In [8], the authors have designed a new fifth-order WENO finite-difference scheme (named WENO-eta) b...
In this paper, we first construct fourth and eighth order central WENO (weighted essen-tially non-os...
In Shen et al. (2020), the authors have proposed a novel weighting method to construct the fifth-ord...
We present a family of high-order, essentially non-oscillatory, central schemes for approximating ...
Abstract(#br)In this paper, we propose a hybrid finite volume Hermite weighted essentially non-oscil...
We show how to combine in a natural way (i.e., without any test nor switch) the conservative and non...
Essentially nonoscillatory (ENO) and weighted ENO (WENO) methods on equidistant Cartesian grids are ...